超刚度、纤维和八字结

What's Next? Pub Date : 2015-05-28 DOI:10.1515/9780691185897-004

M. Bridson, A. Reid

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引用次数: 25

摘要

建立了关于3流形群无穷补全的一些结果。特别地，我们证明了数字8结$S^3-K$的补与所有其他紧3流形的区别在于它的基本群的有限商集。此外，我们证明了如果$M$与$b_1(M)=1$是紧致的3流形，并且$\pi_1(M)$与自由环群$F_r\rtimes\mathbb{Z}$具有相同的有限商，则$M$具有非空边界，圆上的纤维具有紧致纤维，对于某些$\psi\in{\rm{Out}}(F_r)$具有$\pi_1(M)\cong F_r\rtimes_\psi\mathbb{Z}$。

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Profinite Rigidity, Fibering, and the Figure-Eight Knot

We establish results concerning the profinite completions of 3-manifold groups. In particular, we prove that the complement of the figure-eight knot $S^3-K$ is distinguished from all other compact 3-manifolds by the set of finite quotients of its fundamental group. In addition, we show that if $M$ is a compact 3-manifold with $b_1(M)=1$, and $\pi_1(M)$ has the same finite quotients as a free-by-cyclic group $F_r\rtimes\mathbb{Z}$, then $M$ has non-empty boundary, fibres over the circle with compact fibre, and $\pi_1(M)\cong F_r\rtimes_\psi\mathbb{Z}$ for some $\psi\in{\rm{Out}}(F_r)$.

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